Walter's answer was accepted because it answers my original question. But Jan's answer is also informative regarding accuracy of this approach and I encourge everyone to give a read.
I also found this link to be revelant:
Solving vectorized ODE (Solving same ODE with many initial conditions at once).
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I am tring to apply 2nd newton law to many points, where m,r,v,f is a n-by-1, n-by-3, n-by-3, n-by-3, n-by-3, matrixes for mass, position,velocity, and force for n points. The 3 columns are the x,y,z components for those values.
options = odeset('Vectorized','on');
y0=[r,v];
[t,YSol]=ode45(@(t,y) MotionODE(t,y,m,f),[0,dt],y0,options);
r=YSol(t==dt,1:3)';
v=YSol(t==dt,4:5)';
function d2rdt2= MotionODE(t,Y,m,f)
%ODE function for motion
r=Y(:,1:3);
v=Y(:,4:5);
drdt=v;
dvdt=f./m;
d2rdt2=[drdt,dvdt];
end
However I got an error: "Index in position 2 exceeds array bounds (must not exceed 1).". Is the option "vectorized" designed for what I think it is for? How do I get this run correctly (other than a for loop)?
Respuesta aceptada
Walter Roberson
el 17 de Mzo. de 2021
r = Y(1,:);
v = Y(2,:);
drdt = v;
dvdt = f./m * ones(size(v));
d2rdt2=[drdt;dvdt];
3 comentarios
Walter Roberson
el 17 de Mzo. de 2021
Okay, I misread earlier. 'Vectorized' is not useful for your situation.
%m is n x 1
%r is n x 3
%v is n x 3
%f is n x 3
%the boundary conditions are arranged in memory as
%all of the position x coordinates, then all of the position y, then all
%of the position z, then all of the velocity x, then all of the velocity y,
%then all of the velocity z
y0 = [r,v]; %[n x 3, n x 3] --> n x 6
f_over_m = f ./ m; %n x 3 ./ n x 1 -> n x 3
[t,YSol] = ode45(@(t,y) MotionODE(t, y, f_over_m), [0,dt], y0);
R = reshape(YSol(end,1:end/2), [], 3); %px, py, pz
V = reshape(YSol(end,end/2+1:end), [], 3); %vx, vy, vz
function d2rdt2= MotionODE(t, Y, f_over_m)
%ODE function for motion
Y = reshape(Y, [], 6); %px, py, pz, vx, vy, vz
r = Y(:,1:3); %n x 3
v = Y(:,4:5); %n x 3
drdt = v; %n x 3
dvdt = f_over_m; %n x 3
d2rdt2 = reshape([drdt, dvdt], [], 1); %MUST return column vector
end
Más respuestas (1)
Jan
el 17 de Mzo. de 2021
same ODE with many initial conditions at once
This is a bad idea. Remember that the step size control is triggered by the most susceptible component of the trajectory. This reduces the stepsize for all components and in consequence increases the accumulated rounding errors. The total number of calculations can be larger than running the integration for each initial value separately.
4 comentarios
Jan
el 18 de Mzo. de 2021
Do you have the Parallel Processing Toolbox? Then try to replace the FOR by PARFOR.
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